Sergio Arturo Celani
Abstract. In this paper we will give suitable notions of Amalgamation and Superamalgamation properties for the class of quasimodal algebras introduced by the author in his paper QuasiModal algebras.
2000 Mathematics Subject Classification. 06E25, 03G25.
Key words and phrases. Boolean algebras; Quasimodal algebras; Amalgamation and Superamalgamation properties.
1. Introduction and preliminaries
The class of quasimodal algebras was introduced by the author in [2], as a generalization of the class of modal algebras. A quasimodal algebra is a Boolean algebra endowed with a map that sends each element to an ideal of , and satisfies analogous conditions to the modal operator of modal algebras [3]. This type of maps, called quasimodal operators, are not operations on the Boolean algebra, but have some similar properties to modal operators.
It is known that some varieties of modal algebras have the Amalgamation Property (AP) and Superamalgamation Property (SAP). These properties are connected with the Interpolation property in modal logic (see [3]). The aim of this paper is to introduce a generalization of these notions for the class of quasimodal algebras, topological quasimodal algebras, and monadic quasimodal algebras.
We recall some concepts needed for the representation for quasimodal algebras. For more details see [2] and [1].
Let be a Boolean algebra. The set of all ultrafilters is denoted by The ideal (filter) generated in by some subset will be denoted by . The complement of a subset will be denoted by or The lattice of ideals (filters) of is denoted by ().
]]> Definition 1. Let be a Boolean algebra. A quasimodal operator defined on is a function that verifies the following conditions for all
Q1

Q2
A quasimodal algebra, or algebra, is a pair where is a Boolean algebra and is a quasimodal operator.
In every quasimodal algebra we can define the dual operator by where It is easy to see that the operator satisfies the conditions

(1) , and
]]>
(2) ,
for all (see [2]). The class of algebras is denoted by .
Let be a algebra. For each we define the set
Lemma 2. [2] Let .

(1) For each ,
]]>
(2) iff for all , if then
Let . We define on a binary relation by
Throughout this paper, we will frequently work with Boolean subalgebras of a given Boolean algebra. In order to avoid any confusion, if , then we will use the symbol to denote the corresponding operation of A function is an homomorphism of quasimodal algebras, or a homomorphism, if is an homomorphism of Boolean algebras, and
for any A quasiisomorphism is a Boolean isomorphism that is a qhomomorphism.
]]> Let . Let us consider the relational structureFrom the result given in [2] it follows that the Boolean algebra endowed with the operator
defined by
is a quasimodal algebra. Moreover, the map defined by , for each , is a homomorphism i.e. , for each .
]]> Let Let . Define the ideal and the filter . For we define recursively andTheorem 3. [2] Let . Then for all the following equivalences hold:

1. is reflexive.

2. i.e., is transitive.

3. is symmetrical.
Let We shall say that is a topological quasimodal algebra if for every and We shall say that is a monadic quasimodal algebra if it is a quasitopological algebra and for every From the previous Theorem we get that a quasimodal algebra is quasitopological algebra iff the relation is reflexive and transitive. Similarly, a quasimodal algebra is a monadic quasimodal algebra iff the relation is an equivalence.
]]> Let and be two qmalgebras. We shall say that the structure is a quasimodal subalgebra of or qmsubalgebra for short, if is a Boolean subalgebra of and for anyThe following result is given in [1] for Quasimodal lattices.
Lemma 4. Let be a qmalgebra. Let be a Boolean subalgebra of . Then the following conditions are equivalent

(1) There is a quasimodal operator, such that is a subalgebra of

(2) For any , is defined to be .
If , there exists such that and . Then and which is a contradiction.
It is known that the variety of modal algebras has the Amalgamation Property (AP) and the Superamalgamation Property (SAP) (see [3] for these properties and the connection with the Interpolation property in modal logic). In this section we shall give a generalization of these notions and prove that the class has these properties.
Definition 6. Let be a class of quasimodal algebras. We shall say that has the AP if for any triple and injective quasihomomorphisms and there exists and injective quasihomomorphisms and such that and , for every .
We shall say that has the SAP if has the AP and in addition the maps and above have the following property:
]]> For all such that there exists such that and .Let be a class of quasimodal algebras. Without losing generality, we can assume that in the above definition is a subalgebra of and i.e., that and are the inclusion maps.
Theorem 7. The class has the AP.
Proof. Let such is a subalgebra of and . Let us consider the relational structures We shall define the set
and the binary relation in as follows:
is defined by
We note that in this case
Let us define the maps and by
First of all let us check the following property:
 (1) 
Let Since and is a subalgebra of we get by known results on Boolean algebras that there exists such that i.e.,
To see that is injective, let such that Then there exists such that and By (1), there exists such that . So, and i.e., Thus, is injective. It is clear that is a Boolean homomorphism.
We prove next that , for any .
Let Suppose that i.e., From Lemma 2 there exists such that and . By property (1), there exists such that From the inclusion it is easy to see that Thus,
We prove that there exists such that and Let us consider the filter
]]>The filter is proper, because otherwise there exist and such that . So, and since is increasing, we get As is a quasisubalgebra of and we get
Thus,
So, there exists and such that Since Then we have which is a contradiction. Therefore, there exists such that
So, So, we have the inclusion . The inclusion is easy and left to the reader. Thus, , and consequently we get
i.e., is an injective qhomomorphism.
Similarly we can prove that is an injective qhomomorphism. Moreover, it is easy to check that for all , and . Thus, has the AP.
Lemma 8. Let and such that is a subalgebra of and Let , and let us suppose that there exists no such that or . Then there exist such that
Proof. Let us consider the filter in and the filter in We note that
]]>because in otherwise there exists such that , which is a contradiction. Then by the Ultrafilter theorem, there exists that such that
Let us consider in the filter and the ideal . We prove that
Suppose that there exist elements , , and such that . This implies that
Thus, we get , which is a contradiction. So, there exists such that
Theorem 9. The class has the SAP.
Proof. The proof of the SAP is actually analogous to the previous one. Let such that is a qmsubalgebra of and of . Let us consider the set and the quasimodal algebra of the proof above.
Let Suppose that there exists no such that or . By Lemma 8 there exists and there exists such that
The results above can be applied to prove that other classes of quasimodal algebras have the AP and SAP. For example, if is the class of the topological quasimodal algebras, then in the proof of Theorem 7 the binary relation defined on the set is reflexive and transitive. Consequently, is a topological quasimodal algebra and thus the class has the AP and the SAP. Similar considerations can be applied to the class of monadic quasimodal algebras.
I would like to thank the referee for his observations and suggestions which have contributed to improve this paper.
[1] Castro, J. and Celani, S., Quasimodal lattices, Order 21 (2004), 107129. [ Links ]
[2] Celani, S. A., QuasiModal algebras, Mathematica Bohemica Vol. 126, No. 4 (2001), 721736. [ Links ]
[3] Kracht. M., Tools and Techniques in Modal Logic, Studies in Logic and the Foundations of Mathematics, Vol. 142, Elsevier. [ Links ]
Sergio Arturo Celani
CONICET and Departamento de Matemáticas ]]>
Universidad Nacional del Centro
Pinto 399, 7000 Tandil, Argentina
scelani@exa.unicen.edu.ar
Recibido: 9 de marzo de 2007
Aceptado: 19 de septiembre de 2008